Abstract

A pixel-based pixel-value-ordering (PPVO) has been used for reversible data hiding to generate large embedding capacity and high-fidelity marked images. The original PPVO invented an effective prediction strategy in pixel-by-pixel manner. This paper extends PPVO and proposes an obtuse angle prediction (OAP) scheme, in which each pixel is predicted by context pixels with better distribution. Moreover, for evaluating prediction power, a mathematical model is constructed and three factors, including the context vector dimension, the maximum prediction angle, and the current pixel location, are analyzed in detail. Experimental results declare that the proposed OAP approach can achieve higher PSNR values than PPVO and some other state-of-the-art methods, especially in the moderate and large payload sizes.

1. Introduction

Reversible data hiding (RDH) originated from a US patent by Barton in 1997 [1]. This technique can not only hide secret information into a cover medium, but also restore the host medium perfectly in the meantime decoding the embedded data. The superexcellent feature has aroused much attention in the whole research community in no time. For a long time, plenty of applications have been developed in all walks of life, such as secret message transmission, authentication, court evidence, military affairs, and intellectual property protection. What is more, the cover medium contains image, text, audio, and even video. This paper focuses on the image RDH technique.

In the past for more than two decades, RDH has been developed at full speed. So far, several application examples have been reported in numerous literatures, such as image authentication [1, 2], integrity check [3], trusted cloud data coloring [4], medical image processing [5, 6], and stereo image coding [7, 8]. All the aforementioned reality applications benefit from a number of outstanding methods, such as lossless compression, least significant bit (LSB) replacement, difference expansion (DE), integer wavelet transform (IWT), histogram shifting (HS), prediction error expansion (PEE), and sorting. For clarity, four categories shall be designated and elaborated for a brief review in terms of major technical routes.

Firstly, lossless-compression-based methods [9–13] hide data bits into some space of the cover image by losslessly compressing a subset. Fridrich et al. [9] released space by compressing a bit-plane of cover image. This plane was determined as the lowest one to hide a 128-bit hash value. Goljan et al. [10] proposed the so-called R-S scheme. In this way, the cover image was classified into three different block categories, including regular, singular, and unusable, on the basis of the smoothness captured by a discrimination function. R-blocks and S-blocks prepared for data embedding using a flipping function. U-blocks were skipped. Xuan et al. [12] raised a high capacity RDH project on account of IWT, which utilized the coefficients of high frequency subbands to carry data bits. Furthermore, they compressed some selected middle bit-planes of IWT coefficients to make space. Celik et al. [13] put forward a compression method named generalized least significant bit (G-LSB). This technique took advantage of unaltered cover data portions as side information to improve the compression efficiency.

Secondly, DE-based schemes expanded some pixel parameter differences to make space for data hiding. Tian [14, 15] presented the first DE method using pair-wise pixel differences in view of integer Haar wavelet transform [16]. Afterwards, Alattar [17] generalized DE from two pair-wise pixels to arbitrary sized pixel blocks, which improved the embedding rate nearly to bits per pixel (BPP). In viewpoint of computational complexity, Coltuc and Chassery [18] proposed a reversible contrast mapping scheme. Considering the magnitude of difference value, Weng et al. [19] adjusted the sum of pixel pairs and pair-wise differences for the invariability characteristic. Wang et al. [20] reformulated DE as a general integer transformation and extended this transformation. Coltuc [21] reduced the impact of location map for low distortion embedding.

Thirdly, HS-based approaches are the most successful for image RDH. Ni et al. [22] realized the fundamental HS program and van Leest et al. [23] expressed the similar thing. Later on, Ni et al.’s HS scheme was extensively investigated and many improved works came into being [24]. Fallahpour and Sedaaghi [25] applied HS for specified blocks instead of the whole cover image. This processing trick increased EC and reduced distortion. Lee et al. [26] depicted a novel difference histogram rather than conventional pixel intensity histogram. Experiments demonstrated that this Laplacian-like distribution, having a much higher peak point, performed better than aforementioned plane. Hence, pixel spatial correlation was well exploited. Xuan et al. [27] modified the histogram issued from IWT high frequency coefficients. This made distortion minimizing workable by selecting appropriate histogram pairs. Li et al. [28] fine investigated many previous HS schemes [29], treated them as special cases, and constructed a general framework for HS-based RDH. Via this way, one can derive a new RDH operation only needing an element setting.

Finally, PEE-based algorithms, deriving from DE technique, has attracted considerable attention and has developed to a large class SDH branch. Not the practical pixel differences, but the computed prediction errors utilized for expansion are the key issue. Thodi and Rodríguez [30] initiated PEE program and embedded large EC payload with low distortion. Incorporating with HS, PEE exploited much pixel correlation inherent and played well in distortion control. Hu et al. [31] designed an optimized payload-dependent overflow location map for looser pixel shifting constraint than conventional location maps. Therefore, it was constructed with two parts including embedding and shifting. This feature made great auxiliary bit stream compressibility for watermarking payload space. Combining prediction error modification with the above predictor, Hong et al. [32] revised the histogram of prediction errors for vacant position, obtaining EC enhancement efficiently, even several times higher than that of Ni et al. [22]. Sachnev et al. [33] invented a double-layer embedding method uniting HS and PEE. This promoted much accuracy for pixel prediction.

Recently, Li et al. [34] kneaded together sorting, PEE, and HS and raised a high-fidelity RDH method called pixel-value-ordering (PVO). PVO displayed impressive performance for moderate payload size. Soon, Peng et al. [35] and Ou et al. [36] extended this predictor and produced improved pixel-value-ordering (IPVO) and PVO-K techniques. All these predictors obtained prediction values in a block-by-block manner. There are two pixels that might be predicted in each block and this constrains embedding capacity (EC) to some extent. Qu and Kim [37] created a novel pixel-based predictor in raster-scanning order, which predicted pixels in a pixel-by-pixel manner. In this method, the current pixel is previously determined and then predicted by its context pixels. The strategy has been verified as an effective prediction for high EC and peak signal-to-noise ratio (PSNR). However, PPVO only used parts of available referenced pixels within a right angle zone. In order to remedy this problem, a novel obtuse angle prediction (OAP) method will be proposed in this paper. Furthermore, prediction factors and its power weight shall be analyzed in detail.

In the rest sections, this paper shall be organized as follows. Section 2 presents four type classic predictors, containing dynamic prediction (DP), half-enclosing prediction (HEP), and full-enclosing prediction (FEP). PPVO is analyzed as a typical example of right angle prediction (RAP). Section 3 specifies the new proposed OAP type method and influencing factors in detail. Section 4 applies abundant experiments demonstrating the advantage of OAP art. Section 5 gives the conclusion.

2. Related Works

In this section, four prediction schemes based on PEE including dynamic prediction [34–36], half-enclosing prediction [30–32], full-enclosing prediction [33, 40], and PPVO prediction [37] are analyzed as follows.

2.1. Dynamic Prediction

Dynamic prediction obtains prediction values on the basis of context pixels with uncertain locations. Li et al. [34] provided these type prediction frames on behalf of PVO. Afterwards, Peng et al. [35] proposed IPVO and Ou et al. [36] put forward PVO-K as extensive methods. In general, PVO series methods predicted pixels in a block-by-block manner.

Firstly, the host image shall be cut into a temp processing image for some size appropriating for being divided into a great deal of nonoverlapped blocks with equal-size. As for Figure 1, a general sized block B is described, where and . For simplicity, B can be written as a vector in the raster-scan order.

Figure 1 

A general pixel block in PVOs. Red circle indicates the current pixel and blue circles are the referenced pixels.

Secondly, the scanning pixel vector is sorted into a new one in an ascending order. The new ordered block is denoted by B. Thus a vector mapping is derived from to with . If , , and , then .

Then, prediction benchmark shall be established for the location of the current pixel or pixels. That is, there two pixels in a block at most can be determined as the current pixels. Note that, PVOs define different prediction error and its extension methods. Here, how to generate prediction error is mainly explained.

In conventional PVO method, the second largest pixel and the second smallest pixel are determined as the two current pixels, which are predicted by the largest pixel and the smallest pixel . Two prediction errors are obtained aswhere and .

In IPVO method, two current pixels are decided in the same way with PVO. But the two prediction errors are generated bywhere

Thus, the corresponding couple prediction errors may take some values in .

In PVO-K method, two prediction errors are determined to be much more complicated than PVO and IPVO. Three terms shall be assumed for the current pixels confirmation as follows.(i)The smallest pixel value is and the largest pixel value is , .(ii)The second smallest value is no less than the second largest value and these two second minimum and maximum values are from different pixels.

Thereout, the second smallest pixel and the second largest pixel are considered to be the current pixels. The two prediction errors are decided bywhere , .

PVO, IPVO, and PVO-K have the common feature for prediction confirmation. The current pixels must be determined only after pixel sorting. Referenced pixels cannot be identified independently before sorting and context pixels are also incapable. The current pixels are dynamic, the context pixels are dynamic, and so, this type of prediction is called dynamic prediction.

2.2. Half-Enclosing Prediction

Thodi and Rodríguez [30] proposed the first PEE-based method, in which histogram shifting was combined to embed secret data. It invented a simple constructor well exploiting the correlation inherent of the context pixels. Figure 2 described a pixel block. This predictor appointed the red bottom-right pixel to be the current one and the other three blue ones the context pixels. Thus, only pixels before the current pixel were probable to be used for prediction. Here, this is categorized as half-enclosing prediction.

Figure 2 

Context pixels of a block.

Some feature elements were believed in the three context pixels nearby the current pixel. The predictor output was defined byThe prediction value of was marked by

2.3. Full-Enclosing Prediction

A rhombus prediction scheme was presented by Sachnev et al. [33]. This predictor predicted pixels with high accuracy. The core idea was to launch all the four closely surrounding pixels to compute the prediction value. Figure 3 depicted such a case. Two pixel sets are defined as the cross set and the dot set, respectively. In a single-track procedure for embedding or restoring, if the cross set was assigned for current pixels, then the dot set should be the context pixels.

Figure 3 

Context pixels of .

As shown in Figure 3, the current cross pixel is , and the four neighboring pixels are , , , and . The predicted center pixel value is computed as follows:The prediction error is computed asThe expanded prediction error can be applied for a data bit hiding like the difference expansion scheme by Tian [14],where is the to-be-hidden data bit.

Besides this predictor, histogram shift technique was also utilized in this paper to improve embedding performance in terms of low distortion. Two thresholds, including the negative one and the positive one , were introduced to separate the expandable set and the shifting set. The predicted errors belonging to should be expanded and the outer region ones should be shifted towards right or left. Thus, the complete error expansion algorithm is expressed by

2.4. PPVO Prediction

Qu and Kim [37] presented PPVO recently. This method predicted pixel in a pixel-by-pixel manner. Each pixel except a very tiny one had a chance to be predicted, and thus, the prediction probability was larger than those block-mannered prediction schemes.

All the pixels shall be scanned in the sequential raster-scanning order from left to right and then from top to bottom. The top-left pixel is prerequisite to be the current pixel and the others in some sized block are responsible for computing its prediction value. In addition, block size is fixed as , for example. Figure 4 draws the pixel distribution of PPVO.

Figure 4 

Context pixels for PPVO.

3. Proposed Method

3.1. Obtuse Angle Prediction (OAP)

Pixel-based scheme predicts pixels in following some principles. In general, context pixels are employed for predicting the current pixel. Considering reversibility, in raster-scanning order, the to-be-predicted pixel must locate before the context pixels. Figure 5 schedules the pixel distributions in an angle zone. Red circle indicates the current pixel and blue circles denote context pixels. For clarity, pixels shall be processed from left to right and then from top to bottom. The minimum straight-line pixel distance is identified with . From the viewpoint of location relations, three prediction structures are defined as follows.

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Figure 5 

The pixel distribution of angle predictions. (a) Right angle prediction (RAP). (b) Acute angle prediction (AAP). (c) Obtuse angle prediction (OAP).

Definition 1 (prediction angle (PA)). PA refers to the angle developed by the border sides of the current pixel and context pixels. In Figure 5, PA was filled with green arcs.

Definition 2 (right angle prediction (RAP)). RAP stands for pixel distribution with angle cased PA, in which the current pixel locates on the top-left position and context pixels locate within PA region. As shown in Figure 5(a), in the coordinate system, the current pixel is and two context pixels and situate on the boundary lines severally, . Totally, all the context pixels site in the same quadrant or on the positive axis and negative axis. Conventional PPVO belongs to RAP.

Definition 3 (acute angle prediction (AAP)). AAP refers to the type of pixel distribution prediction while PA is acute angle, in which the current pixel lies on the top-left location and context pixels locate within PA area. As shown in Figure 5(b), in the coordinate system, the current pixel is and two context pixels and situate on the boundary lines severally, . Totally, all the context pixels site in the same quadrant or on the only negative axis.

Definition 4 (obtuse angle prediction (OAP)). OAP refers to the type of pixel distribution prediction while PA is obtuse angle, in which the current pixel lies on the top-left location and context pixels locate within PA area. As shown in Figure 5(c), in the coordinate system, the current pixel is and two context pixels and situate on the boundary lines severally, . Totally, all the context pixels site across two different quadrants or on the x positive axis and y negative axis. For convenience, if the aimed pixel locates close behind the top-left position, it is denoted as OAP-I. Along with the next location of the current pixel away from the top-left position, OAP-II, OAP-III, or other multi-OAP are marked. If the number of the first row pixels is signed with , the maximum digit shall be and the according mark is OAP-().

It is easy to see that the difference between the three type predictions is the current pixel’s location, causing different context pixel numbers and distributions. In view of quantity, pixels in the first row, except for the aimed one, are all context pixels in RAP. There is no context pixel at all in the first row in AAP. Nevertheless, there is more than one context pixel in the first row in OAP. Hence, valid context pixel quantities of the above three predictions satisfy this inequation . In terms of prediction angle, consulting the aforementioned pixel distributions of RAP, AAP, and OAP, the layout advantages can be expressed by . Overall, each of OAP and RAP has different strengths and AAP behaves the worst.

3.2. RDH Algorithm for OAP

3.2.1. Data Embedding Procedure

Figure 6 summarizes the embedding procedure with the following four steps.

Figure 6 

The workflow of embedding procedure.

Step 1 (image preprocess). There are two main points. One is to modify marginal pixels probably to overflow the gray value section. For an eight-bit gray-scale image, the intensity range is . On account of the maximum pixel modification being one, 0 and 255 should be adapted to be 1 and 254 before prediction. The other one is to prepare some parameters and data for the follow-up procedure. Location map is used to stamp the modified pixel, which contributes to the reversible workflow. For less size, it should usually be compressed in a lossless compressing way.

Step 2 (testing model). OAP has optional schemes when block size is large enough. With a certain model, context pixel distribution and neighboring regional noise level of the current pixel have to be computed according to EC demand. Generally, iterative computation utilizes unit step size.

Step 3 (determining parameters). A successful embedding happens only when EC is larger than payload size. The minimum noise level threshold (NLT) and the context pixel number (CN) are the most important parameters. Auxiliary information (AI) makes for a reversible scheme. The AI sized headmost pixels extracted the least signal bits (LSB) for AI storage. Thus, LSB, compressed location map, and payload must be combined together to form the to-be-embedded data sequence (DS). Assume that the cover image has pixel size . AI contents are listed as follows:(i)The length of compressed location map ( bits).(ii)The noise level threshold NLT (8 bits).(iii)The context pixel number CN (8 bits).(iv)The location of the last embedded pixel ( bits).

Step 4 (data embedding). Context pixels make up a vector . The maximum value and minimum value of this vector are denoted as and separately. And so, the current pixel is predicted by

The output prediction error is denoted as

A data bit shall be hidden into this current pixel according to the following expanded errorwhere is the to-be-hidden data bit.

Pixels becomes the following values:

Embed all the DS bits into the cover image according to (11)–(14). Substitute the LSB location with AI to get the marked image. Calculate PSNR values and select the highest one as the final result. Of course, this means the corresponding best embedding quality.

3.2.2. Data Extraction and Image Restoration Procedure

Figure 7 describes the data extraction and image restoration procedure with the following four steps.

Figure 7 

The workflow of data extraction and image restoration procedure.

Step 1 (extracting AI for embedding parameters). AI has fixed length. Extract the LSB of the AI sized headmost pixels to AI. Thus, four parameters including the length of compressed location map, NLT, CN, and the location of the last embedded pixel shall be obtained.

Step 2 (extracting DS). Predict pixels with the same method in (11) from the first embedding location to the last embedding pixel. Suppose is the pixel in marked image. In order to distinguish with the embedding procedure, prediction value is denoted as .

The output prediction error is denoted as

A data bit shall be extracted from the current pixel according to the following expanded error:where is the to-be-restored data bit.

Pixels become the following values:

If pixel is equal to the original , a reversible data hiding scheme is acquired.

Step 3 (unzipping compressed location map). Extracted data includes location map and it must be unzipped with the same lossless decoding unzip method.

Step 4 (restoring the cover image). According to the unzipped location map, recover the modified pixels back to original values. Hence, blind extraction and image restoration are accomplished.

3.3. Prediction Factors

For balancing embedding capacity and image fidelity, it is advisable that the pixel block should be too small or too large. From literatures [34–37, 40], block size is proposed between and . By Definition 2, the minimum size dissatisfies OAP condition and the maximum size block may be a little complicated. Therefore, a sized block shall be taken as an example for further analysis.

OAP-I and OAP-II are both depicted in Figure 8. Only pixels behind the current pixel are involved in context vector and the number is equal to its dimension . These two parameters of RAP, OAP-I, and OAP-II are denoted asThus, ; the quantity advantage of context pixels decreased systematically from RAP and OAP-I to OAP-II.

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Figure 8 

Context pixels in different prediction sector radii. (a) RAP; (b) OAP-I; (c) OAP-II.

Observing from Figures 5 and 8, the current pixel and the two side boundary lines form a sector, which can be named by prediction sector. Sector angle and radii feature the context pixel distribution. For further comparison of prediction capability, sector radii need to be defined explicitly in Definition 5.

Definition 5 (prediction sector radii (PSR)). PSR refers to the approaching degree of the current pixel and the active context pixels. It is marked as and the unit is . The amount of is different from previous pixel unit distance and it actually represents a range of distance. Here, .

In blocks of Figure 8, red is the current pixel. The close neighboring green pixels are called radii context pixels . The next closing yellow pixels are 2 radii context pixels . And the external closing pixels are 3 radii context pixels . From this, the context vectors of RAP in different sector radii can be obtained asThe context vectors of OAP-I in different sector radius areThe context vectors of OAP-II in different sector radius are

Predicting image Lena following (11) works out the active context vector dimensions within different sector radius. If , there isIf , there isIf , there is

Table 1 illustrates pixel block sizes within different PSR. Table 2 lists the embedding capacities in different PSR. Four features deserve to be noted as below.(a)In all the three practical sector radii, the context pixel quantity and maximum prediction angle in RAP are both inferior to those in OAP-I and OAP-II. Accordingly, the former’s EC is larger than that in the latter two. Comparing OAP-I with OAP-II, the former has bigger quantity and the latter has a little larger maximum prediction angle. Thus, the two methods output EC at almost the same level.(b)Along with the larger sector radii, embedding capacities are all decreased progressively.(c)When the active radii equal the minimum one , OAP-I and OAP-II have the same context pixels and the maximum prediction angle. Yet, the former’s embedding capacity is larger than the latter’s. This may be caused by the different location of the current pixel.(d)When the active radii are equal to the middle one or the maximum one , OAP-I has the more context pixels than OAP-II, while the former’s embedding capacity is lower than the latter’s. This should be attributed by the more prepositive pixels in sector radii of OAP-II.

The forgoing conclusions declare that the context pixel quantity, the maximum prediction angle, and the current pixel location all have influence on the pixel prediction power. Probable prediction method should be adopted on request for payload size in reality.

Referring to literature [34], shifting bit ratio can generally measure the embedding distortion to the host image

Here, “#” denotes the cardinal number of some set. denotes the maximum capable embedding bits and denotes the maximum shifted bits. The less is, the better fidelity is.

Table 3 compares the shifted ratio in different sector radius. Some conclusions can be summarized as follows.(a)In all the three practical sector radii, the context pixel quantity and maximum prediction angle in RAP are both inferior to those in OAP-I and OAP-II. Accordingly, the former’s shifting ratio is larger than that of the latter two. Comparing OAP-I with OAP-II, the former has bigger quantity and the latter has a little larger maximum prediction angle. Thus, the two methods output shifting ratio at almost the same level.(b)Along with the larger sector radii, the shifting ratios are all decreased progressively.(c)When the active radii equal the minimum one , OAP-I and OAP-II have the same context pixels and the maximum prediction angle. Thus, they get almost the same shifting ratios. As you see, the different locations of the current pixel of the two methods make negligible influence on shifting ratio. This variation is different from that of embedding capacity in Table 2.(d)When the active radii are equal to the middle one or the maximum one , OAP-I has more context pixels than OAP-II, while the former’s shifting ratio is higher than latter’s. This should be attributed by the more prepositive pixels in sector radii of OAP-II.

To sum up, in the minimum sector radii, the current pixel location has nearly no impact on shifting ratio. However, in the middle and maximum sector radius, obvious results appear.

3.4. Prediction Factor Evaluation

Prediction power is mainly determined by three factors, including the context vector dimension, the maximum prediction angle, and the location of the current pixel. For measuring the factor weight, prediction power is computed by Here, indicates the prediction power, is the context vector dimension, theta is the maximum prediction angle, and gamma is the location measurement of the current pixel. By experience, the variance location measurements from the first to the third current pixel take values . The other three symbols , , and are the factor coefficients. Therefore, a weight vector is derived by (23)Variances , , and denote the factor weight, respectively. , . The bigger the values, the greater the impacts. On the contrary, the factor contributes less to prediction power.

Take the data in Table 1, for example, to calculate the prediction powers and factor weights. For facility to express the predicted embedding capacities, is formulated by . In the case of minimum radii , prediction satisfies Hence, and .