An increasing operator is known as a filter if it is idempotent. Such filters are important for such tasks as the suppression of noise, where it is essential to know whether repeated application of some operator has converged. The lattices of filters and of strong filters are discussed, the structure of the invariance domain is examined. The middle filter and alternating sequential filters are described
Morphological filters have shown good performance in various image processing applications. Furtherm...
In the mathematical morphology context, a filter is an operator that is increasing and idempotent. W...
Abstract. A current challenging topic in mathematical morphology is the construction of lo-cally ada...
An increasing operator is known as a filter if it is idempotent. Such filters are important for such...
textabstractA morphological filter is an operator on a complete lattice which is increasing and idem...
A well-known class of morphological filters are the alternating sequential filters. Such filters are...
The construction of morphological filters by iteration of an arbitrary increasing operator is descri...
This paper examines the set-theoretic interpretation of morphological filters in the framework of ma...
This paper extends the theory of median, order-statistic (OS), and stack filters by using mathematic...
The characterization of the root signal sets of the most common digital morphological filters is pre...
Graduation date: 1989Morphological filters have shown good performance in various image processing a...
The present work deals with the A study of morphological opertors with applications. Morphology is n...
In the mathematical morphology context, a filter is an operator that is increasing and idempotent. W...
International audienceMathematical Morphology (MM) is a tool that can be applied to many digital ima...
ABSTRACT This paper treats the problem of establishing bounds for the morphological filter by rec...
Morphological filters have shown good performance in various image processing applications. Furtherm...
In the mathematical morphology context, a filter is an operator that is increasing and idempotent. W...
Abstract. A current challenging topic in mathematical morphology is the construction of lo-cally ada...
An increasing operator is known as a filter if it is idempotent. Such filters are important for such...
textabstractA morphological filter is an operator on a complete lattice which is increasing and idem...
A well-known class of morphological filters are the alternating sequential filters. Such filters are...
The construction of morphological filters by iteration of an arbitrary increasing operator is descri...
This paper examines the set-theoretic interpretation of morphological filters in the framework of ma...
This paper extends the theory of median, order-statistic (OS), and stack filters by using mathematic...
The characterization of the root signal sets of the most common digital morphological filters is pre...
Graduation date: 1989Morphological filters have shown good performance in various image processing a...
The present work deals with the A study of morphological opertors with applications. Morphology is n...
In the mathematical morphology context, a filter is an operator that is increasing and idempotent. W...
International audienceMathematical Morphology (MM) is a tool that can be applied to many digital ima...
ABSTRACT This paper treats the problem of establishing bounds for the morphological filter by rec...
Morphological filters have shown good performance in various image processing applications. Furtherm...
In the mathematical morphology context, a filter is an operator that is increasing and idempotent. W...
Abstract. A current challenging topic in mathematical morphology is the construction of lo-cally ada...
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