Your search keyword '"Complex asymptotics"' showing total 3 results

1. Reductions in binary search trees

Author

María-Inés Fernández-Camacho and José-Ramón Sánchez-Couso

Subjects

Singularity analysis, Binary tree, General Computer Science, Analytic convergence, Optimal binary search tree, Weight-balanced tree, Interval tree, Random binary tree, Theoretical Computer Science, Combinatorics, Differential equation, Binary search tree, Bottom-up algorithm, Ternary search tree, Complex asymptotics, Self-balancing binary search tree, Mathematics, Generating function, Computer Science(all)

Abstract

We analyze two bottom-up reduction algorithms over binary trees that represent replaceable data within a certain system, assuming the binary search tree (BST) probabilistic model. These reductions are based on idempotent and nilpotent operators, respectively. In both cases, the average size of the reduced tree, as well as the cost to obtain it, is asymptotically linear with respect to the size of the original tree. Additionally, the limiting distributions of the size of the trees obtained by means of these reductions satisfy a central limit law of Gaussian type.

Published

2006

2. Average Redundancy for Known Sources: Ubiquitous Trees in Source Coding

Author

Wojciech Szpankowski

Subjects

Kraft's inequality, Source code, General Computer Science, media_common.quotation_subject, complex asymptotics, distribution modulo $1$, prefix codes, [MATH.MATH-DS] Mathematics [math]/Dynamical Systems [math.DS], 0102 computer and information sciences, 02 engineering and technology, Huffman coding, Information theory, Source coding, 01 natural sciences, Theoretical Computer Science, Combinatorics, symbols.namesake, Shannon lower bound, Tunstall code, Hadamard transform, 0202 electrical engineering, electronic engineering, information engineering, Discrete Mathematics and Combinatorics, Khodak code, Fourier series, Mellin transform, data compression, media_common, Mathematics, Lossless compression, redundancy, Huffman code, [MATH.MATH-CO] Mathematics [math]/Combinatorics [math.CO], [INFO.INFO-DM] Computer Science [cs]/Discrete Mathematics [cs.DM], 010201 computation theory & mathematics, symbols, 020201 artificial intelligence & image processing, Data compression

Abstract

Analytic information theory aims at studying problems of information theory using analytic techniques of computer science and combinatorics. Following Hadamard's precept, these problems are tackled by complex analysis methods such as generating functions, Mellin transform, Fourier series, saddle point method, analytic poissonization and depoissonization, and singularity analysis. This approach lies at the crossroad of computer science and information theory. In this survey we concentrate on one facet of information theory (i.e., source coding better known as data compression), namely the $\textit{redundancy rate}$ problem. The redundancy rate problem determines by how much the actual code length exceeds the optimal code length. We further restrict our interest to the $\textit{average}$ redundancy for $\textit{known}$ sources, that is, when statistics of information sources are known. We present precise analyses of three types of lossless data compression schemes, namely fixed-to-variable (FV) length codes, variable-to-fixed (VF) length codes, and variable-to-variable (VV) length codes. In particular, we investigate average redundancy of Huffman, Tunstall, and Khodak codes. These codes have succinct representations as $\textit{trees}$, either as coding or parsing trees, and we analyze here some of their parameters (e.g., the average path from the root to a leaf).

Published

2008

3. Analysis of the multiplicity matching parameter in suffix trees

Author

Wojciech Szpankowski and Mark Daniel Ward

Subjects

General Computer Science, Suffix tree, complex asymptotics, Generalized suffix tree, [INFO.INFO-DS] Computer Science [cs]/Data Structures and Algorithms [cs.DS], 01 natural sciences, Theoretical Computer Science, law.invention, Combinatorics, Logarithmic distribution, law, Discrete Mathematics and Combinatorics, Pattern matching, combinatorics on words, 0101 mathematics, data compression, Analysis of algorithms, Mathematics, Discrete mathematics, Mellin transform, 010102 general mathematics, suffix trees, 010101 applied mathematics, [MATH.MATH-CO] Mathematics [math]/Combinatorics [math.CO], Combinatorics on words, [INFO.INFO-DM] Computer Science [cs]/Discrete Mathematics [cs.DM], pattern matching, [INFO.INFO-CG] Computer Science [cs]/Computational Geometry [cs.CG], autocorrelation polynomial, Suffix

Abstract

In a suffix tree, the multiplicity matching parameter (MMP) $M_n$ is the number of leaves in the subtree rooted at the branching point of the $(n+1)$st insertion. Equivalently, the MMP is the number of pointers into the database in the Lempel-Ziv '77 data compression algorithm. We prove that the MMP asymptotically follows the logarithmic series distribution plus some fluctuations. In the proof we compare the distribution of the MMP in suffix trees to its distribution in tries built over independent strings. Our results are derived by both probabilistic and analytic techniques of the analysis of algorithms. In particular, we utilize combinatorics on words, bivariate generating functions, pattern matching, recurrence relations, analytical poissonization and depoissonization, the Mellin transform, and complex analysis.

Published

2005