Algebraic Integers

Black, Alvin M.

08 1900

The primary purpose of this thesis is to give a substantial generalization of the set of integers Z, where particular emphasis is given to number theoretic questions such as that of unique factorization. The origin of the thesis came from a study of a special case of generalized integers called the Gaussian Integers, namely the set of all complex numbers in the form n + mi, for m,n in Z. The main generalization involves what are called algebraic integers.

integer

Gaussian Integers

algebraic integer

Hardware implementation of daubechies wavelet transforms using folded AIQ mapping

Islam, Md Ashraful

22 September 2010

The Discrete Wavelet Transform (DWT) is a popular tool in the field of image and video compression applications. Because of its multi-resolution representation capability, the DWT has been used effectively in applications such as transient signal analysis, computer vision, texture analysis, cell detection, and image compression. Daubechies wavelets are one of the popular transforms in the wavelet family. Daubechies filters provide excellent spatial and spectral locality-properties which make them useful in image compression.<p> In this thesis, we present an efficient implementation of a shared hardware core to compute two 8-point Daubechies wavelet transforms. The architecture is based on a new two-level folded mapping technique, an improved version of the Algebraic Integer Quantization (AIQ). The scheme is developed on the factorization and decomposition of the transform coefficients that exploits the symmetrical and wrapping structure of the matrices. The proposed architecture is parallel, pipelined, and multiplexed. Compared to existing designs, the proposed scheme reduces significantly the hardware cost, critical path delay and power consumption with a higher throughput rate.<p> Later, we have briefly presented a new mapping scheme to error-freely compute the Daubechies-8 tap wavelet transform, which is the next transform of Daubechies-6 in the Daubechies wavelet series. The multidimensional technique maps the irrational transformation basis coefficients with integers and results in considerable reduction in hardware and power consumption, and significant improvement in image reconstruction quality.

folded mapping

Daubechies wavelet

error-free algorithm

algebraic integer quantization.

Hardware implementation of daubechies wavelet transforms using folded AIQ mapping

Islam, Md Ashraful

22 September 2010

The Discrete Wavelet Transform (DWT) is a popular tool in the field of image and video compression applications. Because of its multi-resolution representation capability, the DWT has been used effectively in applications such as transient signal analysis, computer vision, texture analysis, cell detection, and image compression. Daubechies wavelets are one of the popular transforms in the wavelet family. Daubechies filters provide excellent spatial and spectral locality-properties which make them useful in image compression.<p> In this thesis, we present an efficient implementation of a shared hardware core to compute two 8-point Daubechies wavelet transforms. The architecture is based on a new two-level folded mapping technique, an improved version of the Algebraic Integer Quantization (AIQ). The scheme is developed on the factorization and decomposition of the transform coefficients that exploits the symmetrical and wrapping structure of the matrices. The proposed architecture is parallel, pipelined, and multiplexed. Compared to existing designs, the proposed scheme reduces significantly the hardware cost, critical path delay and power consumption with a higher throughput rate.<p> Later, we have briefly presented a new mapping scheme to error-freely compute the Daubechies-8 tap wavelet transform, which is the next transform of Daubechies-6 in the Daubechies wavelet series. The multidimensional technique maps the irrational transformation basis coefficients with integers and results in considerable reduction in hardware and power consumption, and significant improvement in image reconstruction quality.

folded mapping

Daubechies wavelet

error-free algorithm

algebraic integer quantization.

Uma prova elementar do teorema de Kronecker-Weber / An elementary proof of Kronecker-Weber theorem

Tapia, Hector Edonis Pinedo

06 March 2009

O teorema de Kronecker-Weber afirma que se K é uma extensão finita e galoisiana dos racionais com grupo de Galois abeliano, K tem que ser ciclotômica. / The Kronecker-Weber theorem stablishes that, if K is a Galois finite extension of Q with Galois group abelian, then K is a ciclotomic field.

algebraic integer

ciclotomic field.

corpo ciclotômico.

Dedekind domain

domínio de Dedekind

inteiro algébrico

Uma prova elementar do teorema de Kronecker-Weber / An elementary proof of Kronecker-Weber theorem

Hector Edonis Pinedo Tapia

06 March 2009

O teorema de Kronecker-Weber afirma que se K é uma extensão finita e galoisiana dos racionais com grupo de Galois abeliano, K tem que ser ciclotômica. / The Kronecker-Weber theorem stablishes that, if K is a Galois finite extension of Q with Galois group abelian, then K is a ciclotomic field.

corpo ciclotômico.

domínio de Dedekind

inteiro algébrico

algebraic integer

ciclotomic field.

Dedekind domain