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Öğe Almost perfect autocorrelation sequences with small number of pauses for applications in magnetic resonance(Springer, 2024) Tekin, Eda; Gnilke, Oliver Wilhelm; Ozbudak, Ferruh; Bluemich, Bernhard; Greferath, MarcusIt is well known that it is a challenge to find constant amplitude sequences with perfect autocorrelation over small alphabets. In this work we present a construction that provides sequences with perfect cyclic autocorrelation over different alphabets using the value zero only once or twice in their period. The constructions provide a big variety of periods also at moderate lengths and the corresponding sequences may be considered to be of 'almost' constant amplitude. These sequences have applications in NMR spectroscopy with low excitation power.Öğe Classification of a Sequence Family Using Plateaued Functions(Ieee, 2017) Boztas, Serdar; Ozbudak, Ferruh; Tekin, EdaThe design of CDMA sequence families using quadratic functions dates hack to Gold sequences from the 1960s. Since then there have been a number of different such designs with good correlation properties, some optimal and some near optimal, and the term Gold-like is usually used to denote such sequences. In this paper we use the concept of plateaued functions, not necessarily quadratic, in order to classify such sequence families and present some examples in this direction which depend on the characteristic p and degree n of the Galois field 4, used to define the sequences.Öğe CORRELATION DISTRIBUTION OF A SEQUENCE FAMILY GENERALIZING SOME SEQUENCES OF TRACHTENBERG(Amer Inst Mathematical Sciences-Aims, 2021) Ozbudak, Ferruh; Tekin, EdaIn this paper, we give a classification of a sequence family, over arbitrary characteristic, adding linear trace terms to the function g(x) = Tr(x(d)), where d = p(2k) - p(k) + 1, first introduced by Trachtenberg. The family has p(n) + 1 cyclically distinct sequences with period p(n) - 1. We compute the exact correlation distribution of the function g(x) with linear m-sequences and amongst themselves. The cross-correlation values are obtained as C-i,C-j(tau) is an element of {-1, -1 +/- p(n+e/2), -1 + p(n)}.Öğe Explicit Full Correlation Distribution of Sequence Families Using Plateaued Functions(Ieee-Inst Electrical Electronics Engineers Inc, 2018) Boztas, Serdar; Ozbudak, Ferruh; Tekin, EdaThe design of code division multiple access sequence families dates back to the Gold sequences from the 1960s. Since then there has been a number of different such designs with good correlation properties, some optimal and some near-optimal. In this paper, we use the concept of plateaued functions with arbitrary degree, in order to compute their full correlation distributions. First, we give an explicit correlation distribution of a sequence family using a non-quadratic function. Then for the quadratic functions, we present a general classification of Gold-like sequence families for all possible characteristics p and degrees n of the Galois field F-pn used to define the sequences. We are able to obtain the full correlation distribution of the families we consider. This paper also uses techniques from the theory of algebraic curves in order to obtain some of the results.Öğe Generalized nonbinary sequences with perfect autocorrelation, flexible alphabets and new periods(Springer, 2018) Boztas, Serdar; Ozbudak, Ferruh; Tekin, EdaWe extend the parameters and generalize existing constructions of perfect autocorrelation sequences over complex alphabets. In particular, we address the PSK+ constellation (Boztas and Udaya 2010) and present an extended number theoretic criterion which is sufficient for the existence of the new sequences with perfect autocorrelation. These sequences are shown to exist for nonprime alphabets and more general lengths in comparison to existing designs. The new perfect autocorrelation sequences provide novel alternatives for wireless communications and radar system designers for applications in ranging and synchronisation as well as channel identification.Öğe New Correlations of m-sequences over the finite field F4 compatible with a new bijection to Z4(Ieee, 2022) Boztas, Serdar; Ozbudak, Ferruh; Tekin, EdaIn this paper we obtain a new method to compute the correlation values of two arbitrary sequences defined by a mapping from F(4)n to F-4. We apply this method to demonstrate that the usual nonbinary maximal length sequences have almost ideal correlation under the canonical complex correlation definition and investigate some decimations giving good cross correlation.Öğe A New Method to Compute Sequence Correlations Over Finite Fields(Ieice-Inst Electronics Information Communication Engineers, 2023) Boztas, Serdar; Ozbudak, Ferruh; Tekin, EdaIn this paper we obtain a new method to compute the correlation values of two arbitrary sequences defined by a mapping from F4n to F4. We apply this method to demonstrate that the usual nonbinary maximal length sequences have almost ideal correlation under the canonical complex correlation definition and investigate some decimations giving good cross correlation. The techniques we develop are of independent interest for future investigation of sequence design and related problems, including Boolean functions.
