http://rdf.ncbi.nlm.nih.gov/pubchem/patent/EP-1248149-A1
Outgoing Links
Predicate | Object |
---|---|
assignee | http://rdf.ncbi.nlm.nih.gov/pubchem/patentassignee/MD5_03d0f52bb4069f8a19d70dcfb697c67a |
classificationCPCInventive | http://rdf.ncbi.nlm.nih.gov/pubchem/patentcpc/G03F7-0233 |
classificationIPCInventive | http://rdf.ncbi.nlm.nih.gov/pubchem/patentipc/G03F7-023 |
filingDate | 2001-04-06-04:00^^<http://www.w3.org/2001/XMLSchema#date> |
inventor | http://rdf.ncbi.nlm.nih.gov/pubchem/patentinventor/MD5_6f64d838f9f207611a7bfe5918d95ad7 http://rdf.ncbi.nlm.nih.gov/pubchem/patentinventor/MD5_45c252583cde8d06ccecefeda60d1649 |
publicationDate | 2002-10-09-04:00^^<http://www.w3.org/2001/XMLSchema#date> |
publicationNumber | EP-1248149-A1 |
titleOfInvention | Photosensitive lithographic printing plate |
abstract | A photosensitive lithographic printing plate has a photosensitive layer which comprises an o-naphthoquinonediazide compound and a vinyl-polymerized polymer compound. The vinyl-polymerized polymer compound is insoluble in water and soluble in alkaline aqueous solutions. It is a copolymer containing at least an alkali-soluble group-containing compound and a (meth)acrylamide compound. A photosensitive lithographic printing plate has a photosensitive layer which comprises an o-naphthoquinonediazide compound and a vinyl-polymerized polymer compound. The vinyl-polymerized polymer compound is insoluble in water and soluble in alkaline aqueous solutions. It is a copolymer containing at least the following: (A) an alkali-soluble group-containing compound of formula (I); and (B) a (meth)acrylamide compound of formula (II). [Image] X1>-O- or -NR3>-; R1>, R16>-H or -CH3; R2>bond or a divalent organic group; Y1>arylene; Z1>group having an acidic hydrogen; n : 0 or 1 (when n = 1, then R2> = bond and Z1> = -OH); m : at least 1; and R3>, R17>, R18>H, or 1-12C (cyclo)alkyl, aryl or aralkyl group. |
priorityDate | 2001-04-06-04:00^^<http://www.w3.org/2001/XMLSchema#date> |
type | http://data.epo.org/linked-data/def/patent/Publication |
Incoming Links
Total number of triples: 470.