Abstract

The statistics of sea level is essential in the field of geosciences, ranging from ocean dynamics to climates. The fractal properties of sea level, such as long-range dependence (LRD) or long memory, noise behavior, and self-similarity (SS), are known. However, the description of its multiscale behavior as well as local roughness with the Hölder exponent from a view of multifractional Brownian motion (mBm) is rarely reported, to the best of our knowledge. In this research, we will exhibit that there is the multiscale property of sea level based on s of sea level data recorded by the National Data Buoy Center (NDBC) at six stations in the Florida and Eastern Gulf of Mexico. The contributions of this paper are twofold as follows. (i) Hölder exponent of sea level may not change with time considerably at small time scale, for example, daily time scale, but it varies significantly at large time scale, such as at monthly time scale. (ii) The dispersion of the Hölder exponents of sea level may be different at different stations. This implies that the Hölder roughness of sea level may be spatial dependent.

1. Introduction

The study of sea level fluctuations plays a role in geosciences [13]. There are two categories of time scales of sea level. One is for yearly data with time scales in one yr, or 10 yr, or more; see, for example, [416]. The other is about data with time scales hourly, daily, weekly, or monthly; see, for example, [1739]. The former generally relates to the study of trend of relative mean sea level with respect to global and Earth or planetary changes, for example, in the filed of climates, while the latter is usually associated with the research of local dynamics of sea level in the aspects of navigations, coastal engineering, tide power production, ship design, and so forth. Our research uses the hourly sea level data recorded by NDBC [40].

Since the pioneering work of Hurst on time series with long-range dependence (LRD) is observed in the Nile Basin [41], the LRD property of time series in geosciences has been widely observed; see, for example, [4259]. By LRD, one means that the covariance function of time series decays so slowly such that where is time lag and . Therefore, LRD is a global property of time series [6066].

In addition to LRD, there is another essential property of processes in geosciences, called self-similarity (SS); see, for example, [6784]. By SS, we mean that a random function satisfies the property given by where is the equality in distribution, is the Hurst parameter that measures SS, and is a scale [61, 8386]. Note that the term SS implies the roughness or irregularity of a random function [86]. If satisfies (1.2), it is globally self-similar. That is, its irregularity characterized by keeps the same for all [87], corresponding the case of monofractal [88, 89].

Since the global SS implies the same value of for all , it may be too restrictive to describe real data in engineering and sciences to use a monofractal model. Therefore, multifractal models are desired in various fields of sciences and engineering; see, for example, [8592] and references therein, including those in geosciences; see, for example, [93110], just citing a few. From a view of multifractal, a random function that is not self-similar may be of local self-similarity (LSS).

There are several ways of describing multifractality of a random function based on various definitions of dimensions, such as the Minkowski dimension, the Rényi dimension, the Hausdorff dimension, the packing dimension, the box-counting dimension, and the correlation dimension [86, 89, 90, 111114]. In this paper, we adopt the Hölder exponent in multifractional Brownian motion (mBm) introduced by Peltier and Levy-Vehel [115]. Taking into account in mBm, therefore, one may use the following: to characterize the LSS property of a locally self-similar random function on a point-by-point basis. We call the LSS or local roughness characterized by the Hölder roughness in this paper. The applications of attract increasing interests of researchers in sciences and technologies, ranging from teletraffic to geophysics; see, for example, [116134], simply mentioning a few.

This paper aims at investigating the Hölder multiscales (Hölder scales for short) of sea level. By Hölder scales, we mean the time scales described by the Hölder exponents in mBm. The contributions of this paper are in two aspects. On the one hand, we will reveal that variations of of sea level may be indistinctively at small time scale, for example, daily time scale, but of sea level varies significantly at large time scale, such as at monthly time scale. On the other hand, we will exhibit that the dispersion of the Hölder exponents of sea level may usually be spatial dependent.

The remaining paper is organized as follows. Data used in this research are briefed in Section 2. The method for describing the Hölder exponent in mBm is explained in Section 3. Results of data processing and discussions are given in Section 4, which is followed by conclusions.

2. Data

NDBC is a part of the US National Weather Service (NWS) [135]. It provides scientists with data for their scientific research, including significant wave height and water level [136]. We use the data measured at stations named LKWF1, LONF1, SAUF1, SMKUF1, SPGF1, and VENF1, respectively. In terms of the names of measurement stations, LKWF1 implies the station at Lake Worth, FL [137]; the station LONF1 is the one at Long Key, FL [138]; the station SAUF1 is at St. Augustine, FL [139]; SMKUF1 is the station at Sombrero Key, FL [140]; SPGF1 is at Settlement Point, GBI [141]; and VENF1 is at Venice, FL [142]. They are located in the Florida and Eastern Gulf of Mexico. The data are under the directory of Water Level, which are publicly accessible [143], referring Gilhousen [144] as an instance of research using the data by NDBC.

All data were hourly recorded with ten separate devices indexed by TGn (). Without losing generality, this research utilizes the data from the device TG01. Denote the data series by , where is the name of the measurement station and stands for the index of year. Denote by its corresponding at the station in the year of . For example, and , respectively, represent the measured sea level time series and its at the station LKWF1 in 2002.

If the recorded data are labeled by 99, they are taken as outliers, which are not involved in the computations. In this case, they are replaced with the mean of that series. NDBC suggests that 10 ft should be subtracted from every level series [145]. By taking into account this suggestion in the computation of , we modify by subtracting 10 ft and denote modified data of sea level. That is, Tables 1, 2, 3, 4, 5 and 6 list those data.

3. Methodology

Let be the standard Brownian motion. Then, satisfies the following properties.(i)The increments are Gaussian.(ii) and where .(iii) In nonoverlapping intervals [, ] and [, ], the increments ()-() and ()-() are independent.(iv) and is continuous at .

Kolmogorov introduced a class of random functions the covariance function of which is now recognized as the one of fractional Brownian motion (fBm) [146, Theorem 6]. Note that, for a random function , the function expressed by is termed serial variation function; see, for example, Matérn [147, page 51]. It is usually called variogram in geosciences [148157]. In the field of fluid mechanics, it is named structure function [158161]. Yaglom derived fBm based on the theory of structure functions [162]. In this paper, we use the fBm introduced by Bandelbrot and van Ness based on fractional calculus [163].

It is well known that is nondifferentiable in the domain of ordinary functions [164166]. In the domain of generalized functions, however, it is differentiable [167, 168].

Denote the fBm by . Based on the Weyl’s fractional derivative or integral [163], it is expressed by If the first item on the right hand of (3.3) is taken as the zero-input response of the system that generates for , we may regard the fBm as the convolution of the impulse function and [169]. Therefore, (3.3) may be rewritten by where * is the operator of convolution and It may be interesting to note that is a special case of the operators of fractional order discussed by Mikusinski [170, Equation (59.1)].

The function has the following properties.(i).(ii) The increments () are Gaussian.(iii) Its structure function is given by where .

In addition, it satisfies the self-similarity expressed by (1.2), which implies that is globally self-similar. Consequently, there is a limitation that its self-similarity or roughness keeps the same for all . To release such a limitation, one may adopt the tool of the mBm equipped with the Hölder exponent ; see, for example, [115, 119, 133]. In fact, the mBm is a generalization of fBm by replacing the Hurst parameter in (3.3) with a continuous function that satisfies ; see [87, 115134, 171182]. Denote the mBm by . Then,

Considering the local growth of the increment process of , one may write a sequence given by where is the largest integer not exceeding . Then, at point is given by The above is the expression of applying mBm to investigate of sea level time series, which measures the Hölder roughness of sea level on a point-by-point basis.

4. Observations and Discussions

We demonstrate of sea level series x_smkf1_2008() at the time scales of day, week, and month, respectively.

4.1. Hölder Roughness at Daily Time Scale

Figure 1 indicates 4 daily series of sea level at the station SMKUF1 from Jan. 1 to Jan. 4 in 2008. Figure 2 demonstrates their corresponding Hölder exponents. From Figure 2, we see that of daily series of sea level vary with time insignificantly. Therefore, we obtain the remark below.

Remark 4.1. The Hölder exponents of sea level at the daily time scale, that is, 24 hours, may not vary significantly. This may imply that if hours.

4.2. Hölder Roughness at Weekly Time Scale

Four weekly series of sea level at the station SMKUF1 in Jan. 2008 are shown in Figure 3. Their corresponding Hölder exponents are plotted in Figure 4. They appear monotonically increase, see Figures 4(b) and 4(d), or decrease, see Figures 4(a) and 4(c). In general, they imply the following remark.

Remark 4.2. The Hölder exponents of sea level at the weekly time scale, that is, 168 hours, may not vary considerably enough.

4.3. Hölder Roughness at Monthly Time Scale

Figure 5 illustrates 4 monthly series of sea level at the station SMKUF1 in 2008. Their corresponding Hölder exponents are indicated in Figure 6. From Figure 6, we see the following.

Remark 4.3. The Hölder exponents of sea level at the monthly time scale vary with time significantly.

4.4. Variation of Hölder Roughness at Large Time Scale

We now investigate the Hölder exponents of sea level at large time scale. By large time scale, we mean that the scale is around month or larger. Figure 7(a) indicates the sea level series x_smkf1_2008(), Figure 7(b) shows its Hölder exponent, and Figure 7(c)the histogram of its Hölder exponent.

One thing worth noting is that variances of Hölder exponents of sea level at different stations may be considerably different. For instance, The above implies that the variance of h_smkf1_2008() is larger than that of h_lonf1l2005() in one magnitude of order. Consequently, comes the following remark.

Remark 4.4. The variances of the Hölder exponents of sea level at different observation stations may be considerably different.

We summarize the variances of the Hölder exponents of test data in Tables 7, 8, 9, 10, 11 and 12.

4.5. Discussions

Generally, the Hölder exponents of sea level series are time varying. They are considerably at large time scales but insignificantly at small time scales. In addition, their variations are in general spatial dependent as the Tables 712 exhibit. For instance, in 2002, Var[h()] varies, in the form of magnitude of order, from 10−3 to 10−4 at different stations. This motivates us to take the spatial-time modeling of Hölder roughness of sea level as our possible future work. Finally, we note that the meaning of the term of local roughness of a random function is the same as that of local self-similarity [60, 65, 86]. Thus, according to (1.2), Remarks 4.14.3 exhibit the self-similarity of sea level at small and large time scales, respectively.

5. Conclusions

We have presented our results in the Hölder exponents of sea level in the Florida and Eastern Gulf of Mexico. The present results reveal an interesting phenomenon of time scales of sea level. To be precise, the Hölder exponents of sea level may not vary considerably at small time scales, such as daily time scale, but vary with time significantly at large time scale, such as monthly time scale. Moreover, our research exhibits that variations of the Hölder exponents of sea levels may be spatial dependent. Though the research is with the data in Florida and Eastern Gulf of Mexico, the results may be useful for further exploring general properties of the Hölder scales and roughness of sea level.

Acknowledgments

This work was supported in part by the 973 Plan under the Project no. 2011CB302800, and the National Natural Science Foundation of China under the project Grants nos. 61272402, 61070214, and 60873264. The National Data Buoy Center is highly appreciated for its measured data that makes our research possible.