Examples of 'hadamard' in a sentence
Meaning of "hadamard"
Hadamard (adverb) - Hadamard is a mathematical term that describes a specific type of matrix, function, or operation named after the French mathematician Jacques Hadamard. It is used in the field of linear algebra and analysis
How to use "hadamard" in a sentence
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hadamard
Hadamard matrices and their applications.
Some examples of the Hadamard matrices follow.
The hadamard product and some of its applications in statistics.
Such matrices are now known as Hadamard matrices.
Hadamard matrices and designs.
The concept is a generalization of the Hadamard matrix.
Hadamard factorisation theorem.
The modulation used is a modulation by Hadamard sequences.
Hadamard factorization theorem.
This is also known as the Hadamard product.
Perform a Hadamard on qubits two and three.
The inner code is an orthogonal Hadamard coder.
Applying a Hadamard transform to this state we have.
Such matrices are known in the literature as Hadamard.
Hadamard product is utilized in image compression techniques like JPEG.
See also
Classification of difference matrices and complex Hadamard matrices.
Each Hadamard codeword is written by columns sequentially into an NxN matrix.
It is also the sum of the entries of the Hadamard product.
This can be done by applying Hadamard gates to all qubits in the input register.
The above result holds more generally in a Hadamard space.
The Hadamard gate is very useful for modeling entanglement and disentanglement of qubits.
By way of example a discrete Fourier transform is used or a Hadamard transform.
A Hadamard Encoder is one example of an encoder for mapping onto a set of orthogonal functions.
The plans of experiments are all based on the matrixes of Hadamard.
Many other methods for constructing Hadamard matrices are now known.
The Hadamard conjecture should probably be attributed to Paley.
Such matrices are known in the literature as the Hadamard matrices.
Many generalizations and special cases of Hadamard matrices have been investigated in the mathematical literature.
Walsh functions can be recursively generated using a Hadamard matrix.
A row of the Hadamard matrix may be used as a TRP.
An elementwise division can also be defined in terms of the Hadamard product.
The rows of the Hadamard matrices are the Walsh functions.
This appears to be the first published statement of the Hadamard conjecture.
The Hadamard transform is an example of a generalized class of Fourier transforms.
According to a second variant the said digital signal is a Hadamard code.
The Hadamard product appears in lossy compression algorithms such as JPEG.
A weighing matrix with its weight equal to its order is a Hadamard matrix.
Hadamard and de la Vallée Poussin.
A series for which λk grows this quickly is said to contain Hadamard gaps.
Relation to quantum Hadamard transform.
For his work on the biography of Jacques Hadamard.
See Hadamard transform.
The most important open question in the theory of Hadamard matrices is that of existence.
The Hadamard gate.
The intersection of two deltoids parametrizes a family of complex Hadamard matrices of order six.
Hadamard gates Shor.
A perfectly orthogonal class of sequences that can be used is the class of Hadamard sequences.
Equivalence of Hadamard matrices.
The binary scrambling sequences used as the cover sequence may be the following Hadamard sequences.
Rigorous construction and Hadamard property of the Unruh state in Schwarzschild spacetime.
