| Version (as of 1/23/2015) | 0.9 |
| Platforms | |
| License | Open Source |
| Category | Productivity |
| More Info (visit publisher's website) |
Rating: |
File with an.FZZ extension contains a compressed project of an electronic application – a FZ file. FZZ files are created with the Fritzing software in order to decrease the volume of projects and make them easier to be shared between users. Program (s) that can open the.FZZ file. FZZ file extension Information that help open, edit, and convert.FZZ file. When there is a problem with opening files with the extension.FZZ you do not need to immediately use the services of the IT expert. In most cases, using the helpful suggestions of experts contained in our website as well as appropriate programs you can solve the problem with the.FZZ file yourself. Online FZZ Text Viewer Technical Data for FZZ File Extension an FZZ Computer Aided Drafting file is a special file format by Fritzing and should only be edited and saved with the appropriate software. How to solve problems with FZZ files.
FreeFileViewer is a non-bloated, simple file viewer and music player. For example, it will enable you to display Adobe ® PDF files and Microsoft ® Office documents without Adobe ® Reader ® or Microsoft ® Office being installed, and PSD files without having Adobe ® Photoshop ® installed. This is the all-in-one file viewer product you have. How to open.FZZ files Get a free file viewer with DownloadFileOpener! This free tool is supported by a comprehensive file viewer database containing detailed information for over 6,000 file extensions in association with over 11,000 unique file type categories.
Software Overview
Main Features
- Dynamic views for developing different aspects of your project
- Quick sharing capability to a diverse online community of users
- Projects can be exported to different formats, such as PNG, JPEG, PDF, and SVG
Fritzing is an open source application used to develop electronic circuit projects. The software was originally developed by researchers at the University of Applied Science Potsdam in Germany but has since expanded to other users.
Fritzing provides four different project views for designing Printed Circuit Boards (PCBs):
- Breadboard view - Wire and place virtual electronic parts on a virtual breadboard.
- Schematic view - View and edit the formal representation of the circuit.
- PCB view - Place parts on a PCB and export it for sharing or putting into production.
- Code view - View and modify code and upload it to an Arduino device.
Fritzing allows you to design PCBs through placement of parts, layers, and routes. If ant parts do not exist in the Fritzing parts library, you can edit them with the parts editor. Once finished, you can share your projects with Fritzing's large online community, which features a project gallery for beginners, as well as advanced users.
Fritzing is a useful PCB designing application for hobbyists and serious designers. The software provides dynamic views of and tools to customize your electronic projects, which makes Fritzing a quality choice for designing and sharing PCBs.
Supported File Types
Primary file extension
Other file extensions used by Fritzing 0.9
| Supported File Types | |
|---|---|
| .FZB | Fritzing Bin File |
| .FZBZ | Fritzing Bundled Bin File |
| .FZM | Fritzing Module File |
| .FZP | Fritzing Part File |
| .FZPZ | Fritzing Bundled Part File |
| .FZZ | Fritzing Shareable Project File |
Updated: January 23, 2015
Abstract: We propose new strong/weak dualities in two dimensional conformal fieldtheories by generalizing the Fateev-Zamolodchikov-Zamolodchikov (FZZ-)dualitybetween Witten's cigar model described by the$mathfrak{sl}(2)/mathfrak{u}(1)$ coset and sine-Liouville theory. In aprevious work, a proof of the FZZ-duality was provided by applying thereduction method from $mathfrak{sl}(2)$ Wess-Zumino-Novikov-Witten model toLiouville field theory and the self-duality of Liouville field theory. In thispaper, we work with the coset model of the type$mathfrak{sl}(N+1)/(mathfrak{sl}(N) times mathfrak{u}(1))$ and propose thatthe model is dual to a theory with an $mathfrak{sl}(N+1|N)$ structure. Wederive the duality explicitly for $N=2,3$ by applying recent works on thereduction method extended for $mathfrak{sl}(N)$ and the self-duality of Todafield theory. Our results can be regarded as a conformal field theoreticderivation of the duality of the Gaiotto-Rapčák corner vertex operatoralgebras $Y_{0, N, N+1}[psi]$ and $Y_{N, 0, N+1}[psi^{-1}]$.
Submission history
From: Yasuaki Hikida [view email][v1]Wed, 28 Oct 2020 00:25:56 UTC (29 KB)
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