55 PÉTER ÁGOSTON_ A LOWER BOUND ON THE NUMBER OF COLOURS NEEDED TO NICELY COLOUR A 1:06:05 Andras Stipsicz Contact surgery and Heegaard Floer theory vol1 1:05:29 Andras Stipsicz Contact surgery and Heegaard Floer theory vol3 1:04:39 Andras Stipsicz Contact surgery and Heegaard ...
55 PÉTER ÁGOSTON_ A LOWER BOUND ON THE NUMBER OF COLOURS NEEDED TO NICELY COLOUR A 1:06:05 Andras Stipsicz Contact surgery and Heegaard Floer theory vol1 1:05:29 Andras Stipsicz Contact surgery and Heegaard Floer theory vol3 1:04:39 Andras Stipsicz Contact surgery and Heegaard ...
Upperbounds for the length of discrete non-sequential and sequential search algorithms are established using a randomization theory deriving from the work of A. Renyi. It is shown that these bounds can be given for non-standard, non-homogeneous problems such as the game of "mastermind", known...
Let us explain the link between quasiconcavity and upper semi-continuity of the related functional by considering the dual of these objects, namely quasiconvexity and lower-semicontinuity, that have received much more attention in the literature. We will use as a domain the n-dimensional torus Tn...
wheremis a non-negative integer,Ckω(t)(ω=n−α2) is the ultraspherical (or Gegenbauer) polynomial (see [1]). The expression arises from the generating function for Gegenbauer polynomials (1−2tr+r2)−ω=∑k=0∞Ckω(t)rk, ...
better bounds on the absolute values of the discriminants of CM-fields of a given relative class number. In particular, we will obtain a 4,000-fold improvement on our previous bound for the absolute values of the discriminants of the non-normal sextic CM-fields with relative class number ...
is a \(d_2\times d_2\) lower triangular and, for \(i\ge j,\) $$\begin{aligned} t_{ij}^\sigma (u)=h_{ij}^V(\sigma (u))e^{\vartheta _j(\sigma (u))}, \end{aligned}$$ where \(h_{ij}^V\in \mathbb {R}[a_1,\ldots ,a_k]\) are polynomials in \(a\in A...
15 Vojtěch Rödl On two Ramsey type problems for Kt+1-free graphs 47:07 Vilmos Totik Erdős on polynomials And Ben Green The sum-free set constant is ⅓ 1:45:31 Tomasz Łuczak Threshold functions a historical overview 54:37 Timothy Gowers Erdős and arithmetic progressions 52:06 ...
Upper and Lower Bound Sequences Gilbreath Polynomials Conclusions and Future Work Funding Conflicts of Interest References share Share announcement Help format_quote Cite question_answer Discuss in SciProfiles thumb_up ... Endorse textsms ... Comment Need Help? Support Find support for a speci...
Upper and Lower Bound Sequences Gilbreath Polynomials Conclusions and Future Work Funding Conflicts of Interest References share Share announcement Help format_quote Cite question_answer Discuss in SciProfiles thumb_up ... Endorse textsms ... Comment Need Help? Support Find support for a speci...