Sample Data Synchronization and Harmonic Analysis Algorithm Based on Radial Basis Function Interpolation

<table class="table-group" id="tab1"><tr><td><table class="table"><tr><td class="thead-hr" colspan="4"><hr/></td></tr><tr class="thead"><td align="left">Frequency (Hz)</td><td align="center">Linear</td><td align="center">Quadric</td><td align="center">Newton’s method</td></tr><tr><td class="thead-hr" colspan="4"><hr/></td></tr><tr><td align="left">49.50</td><td align="center"><svg height="9.06134pt" id="M90" style="vertical-align:-0.3625803pt" version="1.1" viewbox="-0.0498162 -8.69876 75.0888 9.06134" width="75.0888pt" xmlns="http://www.w3.org/2000/svg" xmlns:xlink="http://www.w3.org/1999/xlink"><g transform="matrix(.0135,0,0,-0.0135,0,0)"><path d="M249 635C141 635 70 555 70 471C70 401 114 353 179 316C143 294 106 267 90 252C68 231 45 202 45 157C45 50 130 -12 237 -12C322 -12 435 52 435 169C435 256 372 304 303 343C349 374 375 398 383 407C401 429 411 458 411 487C411 569 344 635 249 635ZM238 603C285 603 337 567 337 482C337 422 310 385 276 358C205 393 145 426 145 500C145 552 179 603 238 603ZM248 20C183 20 125 70 125 163C125 218 158 268 206 300C284 261 355 217 355 143C355 66 308 20 248 20Z" id="g113-57"></path><glyph.data ascent="3473" descent="-2876" horiz-adv-x="480" vert-adv-y="480"></glyph.data></g><g transform="matrix(.0135,0,0,-0.0135,6.503,0)"><path d="M113 -12C146 -12 170 11 170 46C170 78 146 103 114 103S58 78 58 46C58 11 82 -12 113 -12Z" id="g113-47"></path><glyph.data ascent="3473" descent="-2876" horiz-adv-x="228" vert-adv-y="228"></glyph.data></g><g transform="matrix(.0135,0,0,-0.0135,9.592,0)"><path d="M412 140C382 77 369 73 315 73H129L270 222C362 320 402 379 402 466C402 571 322 635 234 635C177 635 130 609 99 576L42 495L64 475C90 514 133 568 201 568C274 568 318 519 318 435C318 349 255 267 193 193C144 135 87 78 32 23V0H405C417 45 427 89 440 131L412 140Z" id="g113-51"></path><glyph.data ascent="3473" descent="-2876" horiz-adv-x="480" vert-adv-y="480"></glyph.data></g><g transform="matrix(.0135,0,0,-0.0135,16.095,0)"><path d="M412 140C382 77 369 73 315 73H129L270 222C362 320 402 379 402 466C402 571 322 635 234 635C177 635 130 609 99 576L42 495L64 475C90 514 133 568 201 568C274 568 318 519 318 435C318 349 255 267 193 193C144 135 87 78 32 23V0H405C417 45 427 89 440 131L412 140Z" id="g113-51"></path><glyph.data ascent="3473" descent="-2876" horiz-adv-x="480" vert-adv-y="480"></glyph.data></g><g transform="matrix(.0135,0,0,-0.0135,22.598,0)"><path d="M241 635C89 635 35 457 35 312C35 153 89 -12 240 -12C390 -12 443 166 443 312C443 466 390 635 241 635ZM238 602C329 602 354 454 354 312C354 172 330 22 240 22C152 22 124 173 124 313S148 602 238 602Z" id="g113-49"></path><glyph.data ascent="3473" descent="-2876" horiz-adv-x="480" vert-adv-y="480"></glyph.data></g><g transform="matrix(.0135,0,0,-0.0135,29.102,0)"><path d="M244 635C114 635 38 519 38 422C38 317 111 240 217 240C236 240 255 244 277 256L345 292C311 140 203 39 59 15L64 -15C89 -15 150 -5 204 17C339 72 440 202 440 386C440 521 368 635 244 635ZM228 602C326 602 352 479 352 390C352 370 351 347 348 324C327 308 293 296 258 296C174 296 124 369 124 458C124 517 152 602 228 602Z" id="g113-58"></path><glyph.data ascent="3473" descent="-2876" horiz-adv-x="480" vert-adv-y="480"></glyph.data></g><g transform="matrix(.0135,0,0,-0.0135,35.606,0)"><path d="M391 364C391 409 353 448 295 448C249 448 198 426 152 393C65 331 23 225 23 139C23 14 96 -12 146 -12C198 -12 280 9 367 101L351 124C300 78 242 48 194 48C129 48 109 107 109 162V191C208 213 391 266 391 364ZM313 350C313 305 268 261 113 223C132 334 187 381 217 398C227 404 244 405 261 405C290 405 313 385 313 350Z" id="g113-102"></path><glyph.data ascent="3473" descent="-2876" horiz-adv-x="414" vert-adv-y="414"></glyph.data></g><g transform="matrix(.0135,0,0,-0.0135,44.243,0)"><path d="M535 230V280H52V230H535Z" id="g117-33"></path><glyph.data ascent="3473" descent="-2876" horiz-adv-x="587" vert-adv-y="587"></glyph.data></g><g transform="matrix(.0135,0,0,-0.0135,55.224,0)"><path d="M241 635C89 635 35 457 35 312C35 153 89 -12 240 -12C390 -12 443 166 443 312C443 466 390 635 241 635ZM238 602C329 602 354 454 354 312C354 172 330 22 240 22C152 22 124 173 124 313S148 602 238 602Z" id="g113-49"></path><glyph.data ascent="3473" descent="-2876" horiz-adv-x="480" vert-adv-y="480"></glyph.data></g><g transform="matrix(.0135,0,0,-0.0135,61.727,0)"><path d="M241 635C89 635 35 457 35 312C35 153 89 -12 240 -12C390 -12 443 166 443 312C443 466 390 635 241 635ZM238 602C329 602 354 454 354 312C354 172 330 22 240 22C152 22 124 173 124 313S148 602 238 602Z" id="g113-49"></path><glyph.data ascent="3473" descent="-2876" horiz-adv-x="480" vert-adv-y="480"></glyph.data></g><g transform="matrix(.0135,0,0,-0.0135,68.23,0)"><path d="M456 178V225H360V632H320C217 496 115 347 20 206V178H280V106C280 40 276 34 189 27V0H445V27C364 34 360 39 360 106V178H456ZM280 225H82C149 335 214 431 278 520H280V225Z" id="g113-53"></path><glyph.data ascent="3473" descent="-2876" horiz-adv-x="480" vert-adv-y="480"></glyph.data></g></svg></td><td align="center">1.6279e − 004</td><td align="center">1.4848e − 007</td></tr><tr><td align="left">49.60</td><td align="center">9.0416e − 004</td><td align="center">1.0133e − 004</td><td align="center">4.1249e − 007</td></tr><tr><td align="left">49.70</td><td align="center">3.2312e − 004</td><td align="center">3.7585e − 004</td><td align="center">2.3696e − 007</td></tr><tr><td align="left">49.80</td><td align="center">8.7208e − 004</td><td align="center">3.7908e − 004</td><td align="center">3.6028e − 008</td></tr><tr><td align="left">49.85</td><td align="center">9.2362e − 004</td><td align="center">3.1479e − 004</td><td align="center">4.7762e − 008</td></tr><tr><td align="left">49.90</td><td align="center">8.6749e − 004</td><td align="center">2.2591e − 004</td><td align="center">1.1480e − 007</td></tr><tr><td align="left">49.95</td><td align="center">7.3448e − 004</td><td align="center">1.2716e − 004</td><td align="center">1.6125e − 007</td></tr><tr><td align="left">50.00</td><td align="center">5.5541e − 004</td><td align="center">3.3378e − 005</td><td align="center">1.8374e − 007</td></tr><tr><td align="left">50.05</td><td align="center">3.6123e − 004</td><td align="center">4.0445e − 005</td><td align="center">1.7949e − 007</td></tr><tr><td align="left">50.10</td><td align="center">1.8301e − 004</td><td align="center">7.9253e − 005</td><td align="center">1.4653e − 007</td></tr><tr><td align="left">50.15</td><td align="center">5.1957e − 005</td><td align="center">6.7919e − 005</td><td align="center">8.3851e − 008</td></tr><tr><td align="left">50.20</td><td align="center">5.4970e − 007</td><td align="center">8.7226e − 006</td><td align="center">8.2554e − 009</td></tr><tr><td align="left">50.30</td><td align="center">6.3150e − 004</td><td align="center">1.1163e − 004</td><td align="center">1.3240e − 007</td></tr><tr><td align="left">50.40</td><td align="center">5.7513e − 004</td><td align="center">5.7684e − 006</td><td align="center">2.2788e − 007</td></tr><tr><td align="left">50.50</td><td align="center">1.0963e − 004</td><td align="center">1.9676e − 004</td><td align="center">2.5694e − 007</td></tr><tr class="table-tr"><td colspan="4"><hr class="tbody-hr"/></td></tr></table></td></tr></table>

Relative error comparison for fundamental frequency.

Mathematical Problems in Engineering

tab1

Table 1

Table 1: Sample Data Synchronization and Harmonic Analysis Algorithm Based on Radial Basis Function Interpolation 